﻿ Bifurcation of the compressible Taylor vortex-大连理工大学数学科学学院（新）

# Bifurcation of the compressible Taylor vortex

2017年09月18日 11:01  点击：[]

学术报告

报告题目：Bifurcation of the compressible Taylor vortex

报告人：Yoshiyuki Kagei (Kyushu University, Japan)

报告时间：2017921日（星期四） 上午 1000-11:00

报告地点：创新园大厦A1101

校内联系人：段犇  联系电话：84708351-8135

摘要：

The Couette-Taylor problem, a flow between two concentric rotating cylinders, has been widely studied as a good subject of the study of pattern formation and transition to turbulence. Consider the case where the inner cylinder is rotating with uniform speed and the outer one is at rest. If the rotating speed is sufficiently small, a laminar flow (Couette flow) is stable. When the rotating speed increases, beyond a certain value of the rotating speed, a vortex flow pattern (Taylor vortex) appears. For viscous incompressible fluids, the occurrence of the Taylor vortex was shown to solve a bifurcation problem for the incompressible Navier-Stokes equations. In this talk, this problem will be considered for viscous compressible fluids. The spectrum of the linearized operator around the Couette flow is investigated and the bifurcation of the compressible Taylor vortex is proved when the Mach number is sufficiently small. It is also proved that the compressible Taylor vortex converges to the incompressible one when the Mach number tends to zero. This talk is based on a joint work with Prof. Takaaki Nishida (Kyoto University) and Ms. Yuka Teramoto (Kyushu University).

报告人介绍：

Dr. KAGEI yoshiyuki（隐居良行） is now a professor of department of mathematical sciences from Kyushu University（九州大学）.  His main research interests is mathematical analysis of nonlinear partial differential equations, especially in equations appearing in the fluid mechanics.

He has done many excellent work on Boussinesq equation which is a model equation for thermal convection phenomena, including existence, uniqueness and regularity of solutions, bifurcation problem, and stability problem. Besides, he is also an expert on compressible and incompressible Navier-Stokes equations. His research reveals deep results on the effect of non-local properties and the effect of boundaries on large time behavior of solutions.

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